Decomposition spaces, incidence algebras and M\"obius inversion I: basic theory

TL;DR

This paper introduces the concept of decomposition spaces, a general framework for incidence algebras and M"obius inversion, using homotopy cardinality of $ abla$-groupoids, with applications in combinatorics and Hall algebras.

Contribution

It establishes the foundational theory of decomposition spaces, linking them to incidence coalgebras and functorial properties, and provides new examples beyond classical Segal spaces.

Findings

Decomposition spaces induce incidence coalgebras with $ abla$-groupoid coefficients.

Functorial ULF functors induce coalgebra homomorphisms.

Waldhausen S-construction of stable $ abla$-categories forms a decomposition space.

Abstract

This is the first in a series of papers devoted to the theory of decomposition spaces, a general framework for incidence algebras and M\"obius inversion, where algebraic identities are realised by taking homotopy cardinality of equivalences of $\infty$-groupoids. A decomposition space is a simplicial $\infty$-groupoid satisfying an exactness condition, weaker than the Segal condition, expressed in terms of active and inert maps in Delta. Just as the Segal condition expresses composition, the new condition expresses decomposition, and there is an abundance of examples in combinatorics. After establishing some basic properties of decomposition spaces, the main result of this first paper shows that to any decomposition space there is an associated incidence coalgebra, spanned by the space of 1-simplices, and with coefficients in $\infty$-groupoids. We take a functorial viewpoint throughout, emphasising conservative ULF functors; these induce coalgebra homomorphisms. Reduction procedures in the classical theory of incidence coalgebras are examples of this notion, and many are examples of decalage of decomposition spaces. An interesting class of examples of decomposition spaces beyond Segal spaces is provided by Hall algebras: the Waldhausen S-construction of an abelian (or stable infinity) category is shown to be a decomposition space. Note: The notion of decomposition space was arrived at independently by Dyckerhoff and Kapranov (arXiv:1212.3563) who call them unital 2-Segal spaces. Our theory is quite orthogonal to theirs: the definitions are different in spirit and appearance, and the theories differ in terms of motivation, examples and directions.